Mathematical Physics

The Imaginary Norm

It is known that the direction of a position vectors located along the imaginary dimension of the
Euler coordinate system distorts the symmetry of the Euler cycle. The pertinent Literature in
context has algebraic origins but yet can be argued as has been done by others in the past that –
the direction of the singularities cannot be real and therefore must carry an imaginary
component. To understand how Norms oscillate, we propose the “Norm Wave Function”
whose exposition we give herein is based on the geometric expansion of Norms. The once
speculative Mohammed Abubakr- proposition on Calpanic Numbers, can now find full
justification as a fully-fledged proposition. At the end of it all our contribution in the present
work – if any; is that we shall here in Part One demonstrate that directional singularities that
distorts Euler rotations are imaginary state vectors that are cyclic in nature and in Part two of
this proposition we will further demonstrate that the hypothetical Norm in proposal carry
unique attributes that may have the potential to explain the manifestation of real space from the
imaginary realm.

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